Rational toral rank of a map

Abstract

Let X and Y be simply connected CW complexes with finite rational cohomologies. The rational toral rank r0(X) of a space X is the largest integer r such that the torus Tr can act continuously on a CW-complex in the rational homotopy type of X with all its isotropy subgroups finite H. As a rational homotopical condition to be a toral map preserving almost free toral actions for a map f:X Y, we define the rational toral rank r0(f) of f, which is a natural invariant with r0(idX)=r0(X) for the identity map idX of X. We will see some properties of it by Sullivan models, which is a free commutative differential graded algebra over FHT.